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Monday, 13 October, 2008
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Incompressible Navier-Stokes equations reduce to Bernoulli's Law

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Integrates the vector Navier-Stokes equation to obtain a vector form of Bernoulli's law. Provides interpretation and a mathematical basis for doing calculations.

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Title: Incompressible Navier-Stokes equations reduce to Bernoulli's Law
Description:

Hypercomplex analytic function theory is used to integrate the incompressible Navier-Stokes equations to a simple, vector-valued Bernoulli's Law. The implications for aerodynamic and fluid dynamic calculations are substantial.
Category: Finite - Element - Dynamics - Effect - Mathematics - Nonlinear - Fluid - Equations - Surface - Closed - Flow - Equation - Solution - Theory - Difference - Form - Incompressible - Bernoulli - Turbulence - Function - Aerodynamics - Analytic - Streamlines - Clyde - Characteristic - Eigenfunction - Discontinuity - Davenport - Navier-stokes - Hypercomplex - Gas - Law - Bernoulli\'s


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